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HDU 1788 Chinese remainder theorem again 中国剩余定理

题意:

给定n,AA

以下n个数m1,m2···mn

则有n条方程

res % m1 = m1-AA

res % m2 = m2-AA

问res的最小值

直接上剩余定理,嘿嘿

#include<stdio.h>
#include<string.h>
#include<iostream>
#include<algorithm>
#include<math.h>
#include<set>
#include<queue>
#include<vector>
using namespace std;
#define ll __int64
ll gcd(ll a, ll b) {
	return b == 0 ? a : gcd(b, a%b);
}
//求一组解(x,y)使得 ax+by = gcd(a,b), 且|x|+|y|最小(注意求出的 x,y 可能为0或负数)。

//以下代码中d = gcd(a,b) //能够扩展成求等式 ax+by = c,但c必须是d的倍数才有解,即 (c%gcd(a,b))==0 void extend_gcd (ll a , ll b , ll& d, ll &x , ll &y) { if(!b){d = a; x = 1; y = 0;} else {extend_gcd(b, a%b, d, y, x); y-=x*(a/b);} } ll work(ll l, ll r, ll *m, ll *a){ ll lcm = 1; for(ll i = l; i <= r; i++)lcm = lcm/gcd(lcm,m[i])*m[i]; for(ll i = l+1; i <= r; i++) { ll A = m[l], B = m[i], d, k1, k2, c = a[i]-a[l]; extend_gcd(A,B,d,k1,k2); if(c%d)return -1; ll mod = m[i]/d; ll K = ((k1*c/d)%mod+mod)%mod; a[l] = m[l]*K + a[l]; m[l] = m[l]*m[i]/d; } if(a[l]==0)return lcm; return a[l]; } #define N 100 ll a[N], m[N], n, AA;; int main(){ ll i; while(cin>>n>>AA,n){ for(i=1;i<=n;i++)cin>>m[i]; for(i=1;i<=n;i++)a[i] = m[i]-AA; cout<<work(1,n,m,a)<<endl; } return 0; }



HDU 1788 Chinese remainder theorem again 中国剩余定理